The GCD of given numbers is 1.
Step 1 :
Divide $ 221 $ by $ 35 $ and get the remainder
The remainder is positive ($ 11 > 0 $), so we will continue with division.
Step 2 :
Divide $ 35 $ by $ \color{blue}{ 11 } $ and get the remainder
The remainder is still positive ($ 2 > 0 $), so we will continue with division.
Step 3 :
Divide $ 11 $ by $ \color{blue}{ 2 } $ and get the remainder
The remainder is still positive ($ 1 > 0 $), so we will continue with division.
Step 4 :
Divide $ 2 $ by $ \color{blue}{ 1 } $ and get the remainder
The remainder is zero => GCD is the last divisor $ \color{blue}{ \boxed { 1 }} $.
We can summarize an algorithm into a following table.
221 | : | 35 | = | 6 | remainder ( 11 ) | ||||||
35 | : | 11 | = | 3 | remainder ( 2 ) | ||||||
11 | : | 2 | = | 5 | remainder ( 1 ) | ||||||
2 | : | 1 | = | 2 | remainder ( 0 ) | ||||||
GCD = 1 |
This solution can be visualized using a Venn diagram.
The GCD equals the product of the numbers at the intersection.